Suppose that you are given a decision situation with three possible states of nature: S1, S2,...

Suppose that you are given a decision situation with three possible states of nature: S1, S2,...

Suppose that you are given a decision situation with three possible states of nature: S1, S2, and S3. The prior probabilities are P(S1) = 0.17, P(S2) = 0.53, and P(S3) = 0.30. With sample information I, P(I | S1) = 0.13, P(I | S2) = 0.04, and P(I | S3) = 0.19. Compute the revised or posterior probabilities: P(S1 | I), P(S2 | I), and P(S3 | I). If required, round your answers to four decimal places. State of Nature...

State of Nature P (Sj|I) S1 S2 S3 Suppose that you are given a decision situation...

State of Nature P (Sj|I) S1 S2 S3 Suppose that you are given a decision situation with three possible states of nature: S1, S2, and S3. The prior probabilities are P(S1) = 0.24, P(S2) = 0.60, and P(S3) = 0.16. With sample information I, P(I | S1) = 0.10, P(I | S2) = 0.07, and P(I | S3) = 0.18. Compute the revised or posterior probabilities: P(S1 | I), P(S2 | I), and P(S3 | I). If required, round your...

Consider a decision situation with four possible states of nature: s1, s2, s3, and s4. The...

Consider a decision situation with four possible states of nature: s1, s2, s3, and s4. The prior probabilities are P(s1) = 0.35, P(s2) = 0.15, P(s3) = 0.20, P(s4) = 0.30. The conditional probabilities are P(C|s1) = 0.2, P(C|s2) = 0.09, P(C|s3) = 0.15, and P(C|s4) = 0.20. Find the revised (posterior) probabilities P(s1|C), P(s2|C), P(s3|C), and P(s4|C).

Q.1 Payoff Table: Choices: D1, D2, D3. States of Nature: S1, S2, S3. Profit( in millions)...

Q.1 Payoff Table: Choices: D1, D2, D3. States of Nature: S1, S2, S3. Profit( in millions) for each of the States of Nature are given below: For D1: $100, $400, $500. For D2:-$100, $500, $900. For D3: -$200, $500, $1600. P(s1)=0.4, P(s2)=0.4, P(s3)=0.2. Sample Information Data: Market Research Firm provides following data: conditional probabilities: P(Fav/s1)= 0.40, P(Fav/s2)= 0.5, P(Fav/s3)= 0.9. Then P(Fav)= .54 For the data given in Q.1, compute revised probabilities, draw the decision tree, and enter the payoff...

Consider the following Profit Payoff Table: State of Nature Decision Alternative S1 S2 S3 d1 250...

Consider the following Profit Payoff Table: State of Nature Decision Alternative S1 S2 S3 d1 250 100 25 d2 100 100 75 The probabilities for the states of nature are P(S1) = 0.65, P(S2) = 0.15, and P(S3) = 0.20. What is the optimal decision strategy if perfect information were available? What is the expected value for the decision strategy developed in part (a)? Using the expected value approach, what is the recommended decision without perfect information? What is its...

Below is a payoff table involving three states of nature and three decision alternatives. Decision States...

Below is a payoff table involving three states of nature and three decision alternatives. Decision States of Nature Alternative s1 s2 s3 A –20 10 15 B 16 –5 8 C 15 25 –10 The probability of occurrence of s1 is .2, and the probability of occurrence of s2 is .3. The expected value of alternative C is _____.

State of Nature Decision Alternative s1 s2 s3 s4 d1 600 400 -100 120 d2 700...

State of Nature Decision Alternative s1 s2 s3 s4 d1 600 400 -100 120 d2 700 -200 0 400 d3 700 -200 0 400 P(si) 0.3 0.4 0.2 0.1 For a lottery having a payoff 700 with probability p and -200 with probability (1-p), the decision maker expressed the following indifference probability. Suppose U (700) =100 and U (-200) =-10. Payoff Indifferent Probability 600 0.95 400 0.8 120 0.5 0 0.35 -100 0.2 a) Complete the utility table by using...

Suppose a decision maker is considering three decision alternatives: A1, A2, and A3. Three potential states...

Suppose a decision maker is considering three decision alternatives: A1, A2, and A3. Three potential states of nature have been identified: S1, S2, and S3. The payoff for each combination of alternative and state of nature has been estimated and appears in the following payoff table: S1 S2 S3 A1 113 96 -65 A2 117 62 -52 A3 32 45 40 Calculate the regret (or opportunity loss) value for the combination of A2 and S2.

The following payoff table shows a profit for a decision analysis problem with two decision alternatives...

The following payoff table shows a profit for a decision analysis problem with two decision alternatives and three states of nature. In order to get full credit, show your all work done step by step including cell calculations using excel functions. State of Nature Decion Alternatives s1 s2 s3 d1 250 100 50 d2 100 75 100 a) Construct a decision tree for this problem. b) Suppose that the decision-maker obtains the probabilities P(s1)=0.65, P(s2)=0.15, and P(s3)=0.20. Use the expected...

B. Assume that there is a system with three possible states, S1 with energy 0 eV,...

B. Assume that there is a system with three possible states, S1 with energy 0 eV, S2 with energy 0.4 eV, and S3 with energy 0.6 eV. If this system is placed in contact with a reservoir whose temperature T is such that kBT = 0.5 eV, rank the probabilities of finding the system in each of the three states S1, S2, S3. If the probability of finding the system in any of the states is zero, state so explicitly....